Definably Topological Dynamics of p-Adic Algebraic Groups

Abstract

We study the p-adic algebraic groups G from the definable topological-dynamical point of view. We consider the case that M is an arbitrary p-adic closed field and G an algebraic group over Qp admitting an Iwasawa decompostion G=KB, where K is open and definably compact over Qp, and B is a borel subgroup of G over Qp. Our main result is an explicit description of the minimal subflow and Ellis Group of the universal definable G(M)-flow SG(Mext). We prove that the Ellis group of SG(Mext) is isomorphic to the Ellis group of SB(Mext), which is B/B0. As applications, we conclude that the Ellis groups corresponding to GL(n,M) and SL(n,M) are isomorphic to ( Z × Zp*)n and ( Z × Zp*)n-1 respectively, generalizing the main result of Penazzi, Pillay, and Yao in Some model theory and topological dynamics of p-adic algebraic groups, Fundamenta Mathematicae, 247 (2019), pp. 191--216.